Properties of the map associated with recovering of the Sturm-Liouville operator by its spectral function. Uniform stability in the scale of Sobolev spaces

Abstract

Denote by LD the Sturm-Liouville operator Ly=-y" +q(x)y on the finite interval [0,π] with Dirichlet boundary conditions y(0)=y(π)=0. Let \λk\1∞ and \αk\1∞ be the sequences of the eigenvalues and norming constants of this operator. For all θ ≥slant 0 we study the map F: W2θ lDθ defined by F(σ) =\sk\1∞. Here σ= ∫ q is the primitive of q, s = \sk\1∞ be regularized spectral data defined by s2k =λk-k,\ s2k-1=αk-π/2 and lDθ are special Hilbert spaces which are constructed in the paper as finite dimensional extensions of the usual weighted l2 spaces. We give a complete characterization of the image of this nonlinear operator, show that it is locally invertible analytic map, find explicit form of its Frechet derivative. The main result of the paper are the uniform estimates of the form \|σ-σ1\|θ \| s - s1\|θ, provided that the spectral data s and s1 run through special convex sets in the spaces lDθ.